Affiliation:
1. University of Niš, Faculty of Sciences and Mathematics
Abstract
In order to extend the notion of semi-generalized partial isometries
and partial isometries, we introduce a new class of operators called polynomially partial isometries.
Since this new class of operators contains semi-generalized partial isometries, partial isometries,
isometries and co-isometries, we proposed a wider class of operators.
Several basic properties of polynomially partial isometries and some invariant subspaces of corresponding operators are presented.
We study decomposition theorems and spectral theorems for polynomially partial isometries, generalizing some well-known results for partial isometries and
semi-generalized partial isometries to polynomially partial isometries. Applying polynomially partial isometries, we solve some equations.
Subject
Geometry and Topology,Statistics and Probability,Algebra and Number Theory,Analysis
Reference21 articles.
1. A. Alahmari, M. Mabrouk, M. A. Taoudi, {\it Discussions on partial isometries in
Banach spaces and Banach algebras}, Bull. Korean Math. Soc. 54(2) (2017), 485--495.
2. S. A. Aluzuraiqi, A. B. Patel, {\it On $n$-normal operators}, General Math. Notes 1 (2010), 61--73.
3. C. Apostol, {\it Propri\' et\' es de certains op�erateurs born\' es des espaces de Hilbert II}, Rev. Roum. Math. Purs
Appl. 12 (1967), 759--762.
4. M. L. Arias, M. Mbekhta, {\it On partial isometries in C*--algebras}, Studia Math. 205(1)
(2011), 71--82.
5. C. Badea, M. Mbekhta, {\it Operators similar to partial isometries}, Acta Sci. Math. (Szeged) 71 (2005),
663--680.
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2 articles.
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